5

Fid ta criticel valuols) and rjection region(s) for the indicalod t-tost, lovol of significance und Sumplo Lair-tailed teot " 0.005,n = 13Click to Icon t0 wow ...

Question

Fid ta criticel valuols) and rjection region(s) for the indicalod t-tost, lovol of significance und Sumplo Lair-tailed teot " 0.005,n = 13Click to Icon t0 wow Iho ( dislnbubon tablo .T cucal valuo(s) islaro (Round to the nearest thousandth needed . Usu comnmnaseparale answersnenced )Dutnnina E rejection region(s) Select the correct choice bulow and fill in the answer Doxles within your crocu (Round Iha noarost thousandth reeded )andt?

Fid ta criticel valuols) and rjection region(s) for the indicalod t-tost, lovol of significance und Sumplo Lair-tailed teot " 0.005,n = 13 Click to Icon t0 wow Iho ( dislnbubon tablo . T cucal valuo(s) islaro (Round to the nearest thousandth needed . Usu comnmna separale answers nenced ) Dutnnina E rejection region(s) Select the correct choice bulow and fill in the answer Doxles within your crocu (Round Iha noarost thousandth reeded ) andt?



Answers

Find the area of the indicated region. We suggest you graph the curves to check whether one is above the other or whether they cross, and that you use technology to check your answers. Enclosed by $y=\ln x$ and $y=x-2$ (Round answer to four significant digits.) [First use technology to determine approximately where the graphs cross.]

In this question we have to find the area enclosed by by equals two Natural law index. And why equals two. X x 2 -1 x two. Now, in order to brought the graph of these two functions we will use graphing calculator and enter these values in the graphing calculator. So here is a graph. So here is a graph and this is our scheduled region for which we have to find the area. The intersection points out one comma zero and 3.513 comma 1.256. We got these intersection points from graphing calculator. Now now from these intersection points we can identify our lower limit and upper limit. Lower limit is equal to one and the upper limit is 3.513. Now we know that the area of the shaded region between the two graphs by equals two. F of X and Y equals to geo affects but when X equals two here and x equals two B is given by integral limit it to be. Yeah. F of x minus deal effects. Yes. Now we will put the values so it becomes integral limit one, two, and 3. Natural log x minus x minus one divided by two. Yes. No they will use they will solve this integral by using laughing calculator. So we get the value as you know point. He too boom, cool. So are required areas. Little blind people. Two. Yeah, thank you

In this question we need to calculate the area enclosed by the valves of the given equations. They given equations are right close to eat the power X. Why close to two X plus one and X equals two minus 12 X equals to one. So uh we need to calculate the area enclosed by these cows by using numerical calculators as the technology. So so first of all we will plot the graphs of these equations using graphing calculator. So we um plot the property, these drops of these equations. This state line is for X equals two minus one. And the state line green which is blue is for x equals two one. And here is the cop which is by close to U. To the power X. And this is straight line which is red is for white culture. Two X plus one. We all associate with the region which we need to calculate the area. So we will enter the values in a numerical calculator for integration. Uh As as as me we may calculator on any of the websites or maybe downloaded applications so well we need to enter it in there are definite integral for So so we can see for the first area the upper curve is into the power X. And the lower carb is why it goes to two x plus one. So we will enter and the limit is from Mexico's 2 -1-0 for this red shaded region. So we will enter for the definite integral the lower limit as -1 and the upper limit as zero. And the function F. X. As E. To the power X. And minus for the lower. Lower lower malfunction. We will enter to express one's. So this will become two x minus one actually. And dot dx we will integrate it with respect to dx plus. Uh For the second reason which is shaded in green we need to again uh and enter uh definite integral function. So For the limit again lower limit is zero and the Parliament has one. And the for this the upper cow is why closer to X plus one. So we will enter two X plus one minus E. To the power X. And we will integrate it as with respect to dx. And we will press just enter and we will get the answer as uh huh 0.91339. So we can write it as approximately 0.9138 39 square units. So we got the area of the given region. Using yeah. Using the technology as the uh numerical and graphical calculators. I hope all of you go discussion. This is the area we calculated by using the calculators. Thank you

In discussion, we need to calculate the area bounded by the collapse of the given equations why it goes to two to the power X. And what it calls to express to ah indeed two straight lines which are X goes to minus two and X goes to two. So uh in this question we need to calculate the area by using technology that is by using graphing and numerical calculators. So first of all we will plot the graph of these equations by using graphing calculators. So we plotted the graphs of these equations. This rare straight line is for vehicles to express to, this black car is for vehicles to to to the power eggs. And these two straight lines which are parallel to buy excess are for this blue one for x equals 2 -2. And this green one for exit close to two. Now we need to calculate the area bounded by these four cups. And we shared in that area uh as in red and in green. This green is green area shaded A is very minute that is here. And uh this red shaded region is here. So we know that the uh these two area can be calculated by using numerical calculators. What we need to different integral that they that are two different definite integral. And we need the limits. So the lower limit for this first minute area will be X equals two minus two. And the upper limit can be calculated by using the graphing calculator. Uh For the point of intersection of these two calls we got the two points of intersection for these cuffs one is -1.69 comma 0.13. So it's 0.31. So this point of intersection is uh -1.69. Come up 0.31. And 2nd point of intersection for these calls is uh huh. 2.2 comma four. Here. This point is too common food now. Uh we know the limits for these two areas. For this first one area we will enter the function in the numerical calculator as the definite integral. So the area of these regions will be area A will be calculated by entering the definite integral. So for the limit minus two -1.69. And ah this will be for the minute area shaded in green. And this the alpaca for this function is this area is why constituted the power X. So this will be 2 to the power eggs minus. The logo is quite close to X plus two. So this will be minus X Plus two will become -X -2 here Daddy X. And now plus we will enter another definite integral function. So and there are definite integral for which the lower limit will be minus 1.69. And their parliament will be too. And here the function will be as their parliament is this red straight line which is the function for this is why it goes to X plus two. So this will be X plus two minus. The lower cove is for white, close to two to the power X. So here this will be two to the power X dot d X. Now, by pressing the uh integral for this value, we will get the area in that numerical calculator and we got that as two point 66, approximately 2.66 sq units. So I hope all of you got discussion. Thank you.

In this question we are going to round several numbers to the nearest thousands first one. Yeah. Mhm. Yeah. Instead of using the fraction bar I'm going to write it out the thousands place Is the 3rd number past the decimal. So I look at the eight since it's bigger than five I round this eight up point 0.8 89. Next one. Yeah. Yes. Mhm. Thousands place. Look at the four. It's less than five. So we keep the numeral in front as it is next one. Yeah. Okay. Yeah. Thousands place less than five. Keep the six as it is last one. Yeah. Yes. Thousands place Following number is a five. We're going to round the four up. Okay. Yeah. Yeah. Okay.


Similar Solved Questions

5 answers
Eoshaly Ks bnsin (nwx / ) Denxing correcHy Jh tux CCasks Ad Ike_yalue &l ba for_euery 0zo
eoshaly Ks bnsin (nwx / ) Denxing correcHy Jh tux CCasks Ad Ike_yalue &l ba for_euery 0zo...
5 answers
0.0015 Aisoedererinine M/ and the percent ionization pOH 25 for ofthe following solutions and indicate they are basic 1
0.0015 Aisoedererinine M/ and the percent ionization pOH 25 for ofthe following solutions and indicate they are basic 1...
5 answers
Murrycemogap nic heam GraseJeconamicLaauaieDain Arimane(afdl} ol the Population mean HDL cholesterol lexeNakingaasumptons ibouttho snipetha population distnbuticn_ cacuetoPoint &amatevalve that copantosarge5 506letnlsFromGmallestCalculata point ErmaceMo(di ofthe porulaton standard deulaton mroundthree docima DiacesmaldlHoleVeLoRAEeANCantdereodenaeKnninorLributDodunlic
Murry cemogap nic heam Grase Jeconamic Laauaie Dain Arimane (afdl} ol the Population mean HDL cholesterol lexe Naking aasumptons ibouttho snipe tha population distnbuticn_ cacueto Point &amate valve that copantos arge5 506 letnlsFrom Gmallest Calculata point Ermace Mo(di ofthe porulaton standard...
5 answers
The three-toed sloth Is the slowest moving land marmnal Assumne that on the grourd the sloth moves atan average speed 9t 0.0355 nVs; considerably slower than the giant tortoise; which walks at 0.0476 IVs-Alter 18 minutes of walking how much further would the tortoise have gone relative to the sloth?NumberUnlts
The three-toed sloth Is the slowest moving land marmnal Assumne that on the grourd the sloth moves atan average speed 9t 0.0355 nVs; considerably slower than the giant tortoise; which walks at 0.0476 IVs-Alter 18 minutes of walking how much further would the tortoise have gone relative to the sloth?...
5 answers
3 sin I # fle) then 1 +c0s I f'()=f' (3) =
3 sin I # fle) then 1 +c0s I f'()= f' (3) =...
5 answers
Aresearcher says that 50% ofthe variance in blood pressure can be predicted from heart rate and that blood pressure is positively associated with heart rate. What is the correlation between blood pressure and heart rate?
Aresearcher says that 50% ofthe variance in blood pressure can be predicted from heart rate and that blood pressure is positively associated with heart rate. What is the correlation between blood pressure and heart rate?...
5 answers
Eal vour cereal Boxes cereal Bre labeled &5 contairing 16 ources. Following are the weights of _ sample of [2 bOxes: Assume the population normally distribuled16.05 16.01 16.,06 16,09 16.[5 16.08 15.99 16.12 16.02 15.98 16,03 16.15Palt: 73Part 1 01Find5nnir Kanonno devllnn Round the answetWooxur dcamal placestTlie sample stndud davalion $
Eal vour cereal Boxes cereal Bre labeled &5 contairing 16 ources. Following are the weights of _ sample of [2 bOxes: Assume the population normally distribuled 16.05 16.01 16.,06 16,09 16.[5 16.08 15.99 16.12 16.02 15.98 16,03 16.15 Palt: 73 Part 1 01 Find 5nnir Kanonno devllnn Round the answet ...
5 answers
8.3 Consider the integral: I Jo COST ax Compute Ti,2 using Romberg Integration. #Give your answer to decimal points. Note: Use your calculator in radians_Answer: 2.558835The correct answer is: 032923
8.3 Consider the integral: I Jo COST ax Compute Ti,2 using Romberg Integration. #Give your answer to decimal points. Note: Use your calculator in radians_ Answer: 2.558835 The correct answer is: 032923...
5 answers
Please help and teach me how to find each of the following: AB Ahas 4 valence electrons and B has 6 valence electrons. draw Lewisstructure how many electrons are shared by A and B? what is itsmolecular geometry? what is # of sigma and pi bonds? A's type ofhybrid orbital?
please help and teach me how to find each of the following: AB A has 4 valence electrons and B has 6 valence electrons. draw Lewis structure how many electrons are shared by A and B? what is its molecular geometry? what is # of sigma and pi bonds? A's type of hybrid orbital?...
5 answers
Bir kopriden gecen arac sayISt asagida verilmistir. Verilen datayi kibik polinoma fit ederek 2022 yilinda ne kadar arac gececegini kestiren Polinom ve datayl ayni eksende cizdiren bir program yazin_ odevde program; 2022 yilindaki arac sayISL ve grafik verilecektir)Yil 2000 2002 2004 2006 2008 2010 2012 2014 2016 2018 2020 2022 Arac (milyon) 2.1 45 6.2 7.1 8.0 8.9 10.1 11.4 12.9 14.2 15.6
Bir kopriden gecen arac sayISt asagida verilmistir. Verilen datayi kibik polinoma fit ederek 2022 yilinda ne kadar arac gececegini kestiren Polinom ve datayl ayni eksende cizdiren bir program yazin_ odevde program; 2022 yilindaki arac sayISL ve grafik verilecektir) Yil 2000 2002 2004 2006 2008 2010 ...
5 answers
Arc Srtoc ata: Circles: Math 2 arca: Formnla 0+'; 2 1940 969 8177 0 0 Vi 1 H 82 C sin (G) Half Angle: Adepends 3-07 2 Sheridan quadrant" cos () = +V' 2
Arc Srtoc ata: Circles: Math 2 arca: Formnla 0+'; 2 1 940 969 8177 0 0 Vi 1 H 8 2 C sin (G) Half Angle: Adepends 3-07 2 Sheridan quadrant" cos () = +V' 2...
5 answers
J(y-x)dx+(2x-y)dy for the path UUse Green $ Theorem to evaluate the integral C delined as * = 4cos0 = y =sin0 Leave your answer in terms of I
J(y-x)dx+(2x-y)dy for the path UUse Green $ Theorem to evaluate the integral C delined as * = 4cos0 = y =sin0 Leave your answer in terms of I...
5 answers
The volume V ofa right circular cylinder of radius and height h is V = wrlh related to d ifh is constant and varies with time? (Enter & as drldt ) How is dVifr is constant and h varies with time? (Enter as dh/dt) How is 4 related to dVHow is dVrelated to and # ifboch h and vary with time?
The volume V ofa right circular cylinder of radius and height h is V = wrlh related to d ifh is constant and varies with time? (Enter & as drldt ) How is dV ifr is constant and h varies with time? (Enter as dh/dt) How is 4 related to dV How is dV related to and # ifboch h and vary with time?...
5 answers
S(q) = q2 10q, D(q) = 1088 20q -b. Find the point at which supply and demand are in equilibriumThe equilibrium point is(Type an ordered pair )c. Find the consumers' surplusThe consumers' surplus is Sl (Type an integer or decimal rounded to the nearest hundredth as needed ) d. Find the producers' surplus
S(q) = q2 10q, D(q) = 1088 20q - b. Find the point at which supply and demand are in equilibrium The equilibrium point is (Type an ordered pair ) c. Find the consumers' surplus The consumers' surplus is Sl (Type an integer or decimal rounded to the nearest hundredth as needed ) d. Find the...

-- 0.019149--